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The Heisenberg-Weyl-parity group its coherent states and a unified Wigner-Weyl function

Published 14 May 2026 in quant-ph | (2605.14820v1)

Abstract: The Heisenberg-Weyl group $HW(d)$ related to a $d$-dimensional Hilbert space $H(d)$, is enlarged into the Heisenberg-Weyl-parity group $HWP(d)$ that incorporates parity transformations. It consists of $2d3$ elements, of which $d3$ elements belong to the $HW(d)$ subgroup, and extra $d3$ elements which are related through a Fourier transform with the former ones. It is shown that $HWP(d)$ is a generalised version of the dihedral group. The properties of operators that combine displacements and parity, are discussed. $HWP(d)$ is shown to be a solvable group, and commutators of its elements perform displacement and parity transformations of quantum states, along loops in the discrete phase space.$2d2$ coherent states related to the $HWP(d)$ group are introduced, which consist of $d2$ coherent states related to the $HW(d)$ subgroup, and extra $d2$ coherent states which are related through a Fourier transform with the former ones. In noisy cases, expansion of an arbitrary state in terms of the $2d2$ coherent states with Bargmann coefficients, is advantageous in comparison to expansion in terms of the $d2$ coherent states related to $HW(d)$. One of the consequences of the $HWP(d)$ group, is a natural unification of the Wigner and Weyl functions. The properties of the unified Wigner-Weyl function are discussed.

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